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The characteristic equation for a generic homogeneous second order ODE, can be given in the following form: ap+bp+c=0 Match each root locus plot (A -
The characteristic equation for a generic homogeneous second order ODE, can be given in the following form: ap+bp+c=0 Match each root locus plot (A - F) to the correct set of coefficients (a,b,c) of the polynomial. Root Locus Root Locus Root Locus 10 10 10 tel -8 -10 -10 -5 10 -10 -104 -10 10 10 0 Real 0 Real 0 Real Poot Locus Root Locus Root Locus 10 10 10 8 8 8 6 6 6 4 4 4 2 2 2 Imaginary E Imaginary + D -8 -104 -10 -5 5 10 -10 5 10 -10 -5 5 10 0 Real 0 Real Real Root Locus Polynomials a=x, b=0.5.c=3, x= [0,2] a=1,b=7.2*x,c= 12.96, x= [0,1.1] a=0.1,b=0.5,c=x, x= [0,3] a=1,b=1.4*x,c=x, x= [0,10] a=x,b=1,c=3, x=0,0.5] a=1,b=13.2*x,c=43.56, x= [0,1.1]
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